Pseudo-B-Fredholm operators, poles of the resolvent and mean convergence   in the Calkin Algebra

Mohammed Berkani; Sne\v{z}ana \v{C}. \v{Z}ivkovi\'c-Zlatanovi\'c

arXiv:1805.08741·math.SP·May 23, 2018

Pseudo-B-Fredholm operators, poles of the resolvent and mean convergence in the Calkin Algebra

Mohammed Berkani, Sne\v{z}ana \v{C}. \v{Z}ivkovi\'c-Zlatanovi\'c

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TL;DR

This paper introduces pseudo B-Fredholm operators, characterizes their structure via Riesz and B-Fredholm operators, and explores their spectral properties and mean convergence in the Calkin algebra.

Contribution

It defines pseudo B-Fredholm operators and characterizes their structure, linking spectral properties to operator decompositions involving Riesz and B-Fredholm operators.

Findings

01

0 is a pole of the resolvent iff T=K+F with K power compact and F B-Fredholm

02

Pseudo B-Fredholm operators are characterized by T=R+F with R Riesz and F B-Fredholm

03

Characterization of mean convergence in the Calkin algebra

Abstract

We define here a pseudo B-Fredholm operator as an operator such that 0 is isolated in its essential spectrum, then we prove that an operator $T$ is pseudo- B-Fredholm if and only if $T = R + F$ where $R$ is a Riesz operator and $F$ is a B-Fredholm operator such that the commutator $[R, F]$ is compact. Moreover, we prove that 0 is a pole of the resolvent of an operator $T$ in the Calkin algebra if and only if $T = K + F$ , where $K$ is a power compact operator and $F$ is a B-Fredholm operator, such that the commutator $[K, F]$ is compact. As an application, we characterize the mean convergence in the Calkin algebra.

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